Let circle `'c_1'` be inscribed in a square whith side lenght 1. As shown in figure smallar cicle `c_2` is inscribed in the lower right corner of the square so that `c_2` is tangent to 'c_1'` and the two sides of the square then the area of the `'c_2'` is

Let circle c_(1), be inscribed in a square with side length 1. As shown in figure smaller circle c_(1) is inscribed in the lower right corner of the square so that c_(1) is tangent to c_(2) and the two sides of the square then the area of the c_(2) is

A square of side 3 cm is inscribed in a circle. Find the area of the shaded portion.

If a circle is inscribed in a square of side 10, so that the circle touches the four sides of the square internally then radius of the circle is

If a circle is inscribed in a square of side 10, so that the circle touches the four sides of the square internally then radius of the circle is

If a circle is inscribed in a square of side 10, so that the circle touches the four sides of the square internally then radius of the circle is

A circle is inscribed in an equilateral triangle of side length a. The area of any square inscribed in the circle is

8. Let S, be a square of unit area. A circle C_1, is inscribed in S_1, a square S_2, is inscribed in C_1 and so on. In general, a circle C_n is inscribed in the square S_n, and then a square S_(n+1 is inscribed in the circle C_n. Let a_n denote the sum of the areas of the circle C_1,C_2,C_3,.....,C_n then lim_(n->oo) a_n must be

What is the area of a circle inscribed in a square of side 'a' units?

A circle is inscribed in a equilateral triangle of side 24 cm. What is the area ( in cm^(2) ) of a square inscribed in the circle ?

If the area of a circle inscribed in a square is 9pi cm^(2) then the area of the square is